| Popis: |
We study a class of combinatorial designs called Kirkman systems, and we show that infinitely many Kirkman systems are well-distributed in a precise sense. Steiner triple systems of order $n$ can achieve a minimum block sum of $n$. Kirkman triple systems form parallel classes from the blocks of Steiner triple systems. We prove that there are an infinite number of Kirkman triple systems that have a minimum block sum of $n$. We expand this to quadruple systems. These concepts can then be applied to distributed storage to spread data across the servers, and servers across locations, using Kirkman triple systems, while having data well distributed by popularity, measured by the minimum block sum. |
